On the Equivariant Tamagawa number conjecture for Tate motives

For a finite Galois extension K/k of number fields, with Galois group G, the equivariant Tamagawa number conjecture of Burns and Flach relates the leading coefficients of Artin L-functions to an element of K 0 (Z[G], R) arising from the Tate sequence. This conjecture is known to be true for certain

## Abstract In this paper, we prove the weak __p__‐part of the Tamagawa number conjecture in all non‐critical cases for the motives associated to Hecke characters of the form $\varphi ^a\overline{\varphi }^b$ where φ is the Hecke character of a CM elliptic curve __E__ defined over an imaginary quad

In this paper we prove, under the assumption that the Soule´regulator map is injective, that, for all integers k50, the description by the local Tamagawa number conjecture for CM elliptic curves defined over Q, corresponding to the values of their L-functions at k þ 2, is true.